Background: The refolding of proteins from inclusion bodies is affected by several factors, including solubilization of inclusion bodies by denaturants, removal of the denaturant, and assistance of refolding by small molecule additives. Objectives: The purpose of this study was optimization of recombinant human interferon-b purification in order to achieve higher efficiency, yield, and a produ...

We prove local and global invertibility of Sobolev solutions of certain differential inclusions which prevent the differential matrix from having negative eigenvalues. Our results are new even for quasiregular mappings in two dimensions.

In this work, the authors study the existence of solutions for fractional differential inclusions in the sense of Almgren with Riemann-Liouville derivative. They also show the compactness of the solution set. A Peano type existence theorem is also proved.

Some existence results are obtained for periodic solutions of nonautonomous second-order differential inclusions systems with p–Laplacian.

We discuss the existence of solutions, u ∈ φ+W 1,∞ 0 (Ω;R), for differential inclusions of the form Du(x) ∈ E, a.e. in Ω . 1 – Introduction In this article we discuss the existence of solutions, u ∈ W 1,∞(Ω;Rm), for the Dirichlet problem involving differential inclusions of the form

THE first description of the inclusion bodies of trachoma was made by Halberstaedter and von Prowazek following the examination of Giemsa-stained scrapings from the conjunctivae of baboons which had been inoculated with secretions from trachomatous patients (cf. Julianelle, 1938). Since then Giemsa and its modifications have held prime place as a means of demonstrating these structures and this...

In this paper, the authors consider the first-order nonresonance impulsive differential inclusion with periodic conditions y′(t)− λy(t) ∈ F (t, y(t)), a.e. t ∈ J\{t1, . . . , tm}, y(t+k )− y(t − k ) = Ik(y(t − k )), k = 1, 2, . . . ,m, y(0) = y(b), where J = [0, b] and F : J × R → P(R) is a set-valued map. The functions Ik characterize the jump of the solutions at impulse points tk (k = 1, 2, ....

and Applied Analysis 3 The results of this paper can easily to be generalized to the boundary value problems of fractional differential inclusions 1.4 with the following integral boundary conditions: a1x 0 b1 cDγx 0 ) c1 ∫T